On the vectorial Ekeland's variational principle and minimal points in product spaces

In this paper, we establish Ekeland's variational principle and an equilibrium version of Ekeland's variational principle for vectorial multivalued mappings in the setting of separated, sequentially complete uniform spaces. Our approaches and results are different from those in Chen et al. (2008( ),

An extension of Ekeland's variational principle in fuzzy metric space, which is an essential and the most general improvement of Ekeland's variational principle in fuzzy metric space up to now, is established. As an application, we obtain Caristi's coincidence theorem for set-valued mappings in fuzz

In this paper, we apply an existence theorem for the variational inclusion problem to study the existence results for the variational intersection problems in Ekeland's sense and the existence results for some variants of set-valued vector Ekeland variational principles in a complete metric space. O

The main purpose of this paper is to introduce the concept of F-type topological spaces and to establish a variational principle and a fixed point theorem in the kind of spaces, which extend Ekeland's variational principle and Caristi's fixed point theorem, respectively.